# Invariant curves for endomorphisms of $\mathbb P^1\times \mathbb P^1$

**Authors:** Fedor Pakovich

arXiv: 1904.10952 · 2022-05-18

## TL;DR

This paper characterizes invariant algebraic curves for certain endomorphisms of , showing they are genus zero and rationally parametrized unless associated with special maps, with applications to dynamical orbits and rational points.

## Contribution

It provides a classification of invariant curves for product endomorphisms of , establishing genus and parametrization properties, and offers criteria for Zariski dense orbits and finiteness results.

## Key findings

- Invariant curves have genus zero unless associated with special maps.
- Rational parametrizations commute with the endomorphisms.
- Finitely many invariant curves exist for each bi-degree.

## Abstract

Let $A_1, A_2\in \mathbb C(z)$ be rational functions of degree at least two that are neither Latt\`es maps nor conjugate to $z^{\pm n}$ or $\pm T_n.$ We describe invariant, periodic, and preperiodic algebraic curves for endomorphisms of $(\mathbb P^1(\mathbb C))^2$ of the form $(z_1,z_2)\rightarrow (A_1(z_1),A_2(z_2)).$ In particular, we show that if $A\in \mathbb C(z)$ is not a "generalized Latt\`es map", then any $(A,A)$-invariant curve has genus zero and can be parametrized by rational functions commuting with $A$. As an application, for $A$ defined over a subfield $K$ of $ \mathbb C$ we give a criterion for a point of $(\mathbb P^1(K))^2$ to have a Zariski dense $(A, A)$-orbit in terms of canonical heights, and deduce from this criterion a version of a conjecture of Zhang on the existence of rational points with Zariski dense forward orbits. We also prove a result about functional decompositions of iterates of rational functions, which implies in particular that there exist at most finitely many $(A_1, A_2)$-invariant curves of any given bi-degree $(d_1,d_2).$

## Full text

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## References

35 references — full list in the complete paper: https://tomesphere.com/paper/1904.10952/full.md

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Source: https://tomesphere.com/paper/1904.10952